Convex Sets Associated to C*-Algebras

Abstract

For A a separable unital C*-algebra and M a separable McDuff II1-factor, we show that the space Homw(A,M) of weak approximate unitary equivalence classes of unital *-homomorphisms A → M may be considered as a closed, bounded, convex subset of a separable Banach space -- a variation on N. Brown's convex structure Hom(N,RU). When A is nuclear, Homw(A,M) is affinely homeomorphic to the trace space of A, but in general Homw(A,M) and the trace space of A do not share the same data (several examples are provided). We characterize extreme points of Homw(A,M) in the case where either A or M is amenable; and we give two different conditions -- one necessary and the other sufficient -- for extremality in general. The universality of C*(F∞) is reflected in the fact that for any unital separable A, Homw(A,M) may be embedded as a face in Homw(C*(F∞),M). We also extend Brown's construction to apply more generally to Hom(A,MU).